Aller au contenu

Mathc initiation/a538

Un livre de Wikilivres.


Sommaire


Installer et compiler ces fichiers dans votre répertoire de travail.

c00a.c
/* --------------------------------- */
/* save as c00a.c                    */
/* --------------------------------- */
#include "x_afile.h"
#include      "fb.h"                 /* Try  fb.h, fc.h ... fj.h */
/* --------------------------------- */
int main(void)
{
 clrscrn();  
 printf(" The Laplace transform of F(t) is f(s) \n\n" 
        "            / oo                         \n" 
        "           |                             \n" 
        " L{F(t)} = |    exp(-s t) F(t) dt = f(s) \n" 
        "           |                             \n" 
        "           /  0                      \n\n\n");
 
 
 printf(" First translation property of the Laplace transform is : \n\n"
        "   L{exp(a*t) * F(t)} = f(s-a)                            \n\n");
 stop();
 
 clrscrn(); 
 printf(" If  F(t) : t-> %s  then  f(s) = %s\n\n", Feq, feq);  
 
 printf(" Then :\n\n"
        "   L{exp(a*t) * F(t)} = f(s-a)\n"
        "                      = %s   \n"
        "                      = %s   \n\n", f_seq,f2seq);

 printf(" With  s = (%+.3f) and  a = %+.3f\n\n", s, aa);
 
 printf(" Then  f(s-a)  = %s = (%+.3f)\n\n", f2seq, f_s(s)); 
 
 stop();
 
 return 0;
}
/* --------------------------------- */
/* --------------------------------- */


Exemple de sortie écran :

 The Laplace transform of F(t) is f(s) 

            / oo                         
           |                             
 L{F(t)} = |    exp(-s t) F(t) dt = f(s) 
           |                             
           /  0                      


 First translation property of the Laplace transform is : 

   L{exp(a*t) * F(t)} = f(s-a)                            

 Press return to continue.


Exemple de sortie écran :

 If  F(t) : t-> t  then  f(s) = (1/s^2)

 Then :

   L{exp(a*t) * F(t)} = f(s-a)
                      = 1/(s-a)^2   
                      = 1/(s-a)^2   

 With  s = (+0.600) and  a = +0.400

 Then  f(s-a)  = 1/(s-a)^2 = (+25.000)

 Press return to continue.